On the rank of quadratic equations for curves of high degree
Abstract
Let C ⊂ Pr be a linearly normal curve of arithmetic genus g and degree d. In SD, B. Saint-Donat proved that the homogeneous ideal I(C) of C is generated by quadratic equations of rank at most 4 whenever d ≥ 2g+2. Also, in EKS Eisenbud, Koh and Stillman proved that I(C) admits a determinantal presentation if d ≥ 4g+2. In this paper, we will show that I(C) can be generated by quadratic equations of rank 3 if either g=0,1 and d ≥ 2g+2 or else g ≥ 2 and d ≥ 4g+4.
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